Extremal Graphs for a Spectral Inequality on Edge-Disjoint Spanning Trees

Abstract

Liu, Hong, Gu, and Lai proved if the second largest eigenvalue of the adjacency matrix of graph G with minimum degree δ 2m+2 4 satisfies λ2(G) < δ - 2m+1δ+1, then G contains at least m+1 edge-disjoint spanning trees, which verified a generalization of a conjecture by Cioaba and Wong. We show this bound is essentially the best possible by constructing d-regular graphs Gm,d for all d 2m+2 4 with at most m edge-disjoint spanning trees and λ2(Gm,d) < d-2m+1d+3. As a corollary, we show that a spectral inequality on graph rigidity by Cioaba, Dewar, and Gu is essentially tight.